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This section assumes you have enough background in calculus to be familiar with integration. In Instantaneous Velocity and Speed and Average and Instantaneous Acceleration we introduced the kinematic functions of velocity and acceleration using the derivative. By taking the derivative of the position function we found the velocity function, and likewise by taking the derivative of the velocity function we found the acceleration function. Using integral calculus, we can work backward and calculate the velocity function from the acceleration function, and the position function from the velocity function.
Let’s begin with a particle with an acceleration a (t) is a known function of time. Since the time derivative of the velocity function is acceleration,
we can take the indefinite integral of both sides, finding
where C 1 is a constant of integration. Since , the velocity is given by
Similarly, the time derivative of the position function is the velocity function,
Thus, we can use the same mathematical manipulations we just used and find
where C 2 is a second constant of integration.
We can derive the kinematic equations for a constant acceleration using these integrals. With a ( t ) = a a constant, and doing the integration in [link] , we find
If the initial velocity is v (0) = v 0 , then
Then, C 1 = v 0 and
which is [link] . Substituting this expression into [link] gives
Doing the integration, we find
If x (0) = x 0 , we have
so, C 2 = x 0 . Substituting back into the equation for x ( t ), we finally have
which is [link] .
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